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Abraham Fraenkel
The Z of ZF and ZFC and ZF¬C
Equivalents to the Axiom of Choice and Their Uses A
Abraham Robinson 1918–1974
What Is Mathematics: Gödel's Theorem and Around. by Karlis
SET THEORY Andrea K. Dieterly a Thesis Submitted to the Graduate
John Von Neumann • Zermelo-Fraenkel John Von Neumann
The Axiom of Choice and Its Implications in Mathematics
Fraenkel's Axiom of Restriction: Axiom Choice, Intended Models And
Simple Functional Data
Von Neumann's Methodology of Science
AA Fraenkel's Philosophy of Religion
Recollections of a Jewish Mathematician in Germany
What Makes a Theory of Infinitesimals Useful? a View by Klein and Fraenkel," Journal of Humanistic Mathematics, Volume 8 Issue 1 (January 2018), Pages 108-119
Zermelo-Fraenkel Set Theory with the Axiom of Choice
The Axiom of Choice and Related Topics
Levy and Set Theory
Talmudic Foundations of Mathematics
The Path to the Iterative Conception
Top View
John Von Neumann and Hilbert's School of Foundations of Mathematics∗
The Axiom of Choice: the Last Great Controversy in Mathe- Matics
Extended Essay - Mathematics
The New Axiom of Set Theory and Bell Inequality
Paper Abstracts
FOUNDATIONS-OF-MATH.Odt
Arxiv:Math/9209205V1 [Math.LO] 15 Sep 1992
Logic in the Second Half of the Twentieth Century
Zermelo-Fraenkel Set Theory with the Axiom of Choice the Axioms Of
Dedekind, Functions on Natural Numbers, and Large Cardinals (Dedekind and the Problem of Categoricity)
The Standard ZFC Axioms for Set Theory Provide an Operative
Does Singleton Set Meet Zermelo-Fraenkel Set Theory with the Axiom of Choice?
The Independence of the Axiom of Choice in Set Theory
1 United States District Court for the District Of
MAGIC Set Theory Lecture 2
Set Theory from Cantor to Cohen
Sets and Games
Zermelo–Fraenkel Set Theory